St. Petersburg Mathematical Journal, 16. cilt,437-1077. sayfalarAmerican Mathematical Society, 2005 |
Kitabın içinden
81 sonuçtan 1-3 arası sonuçlar
Sayfa 466
... belongs to V - 2 [ 3 ] -n - 8 ( BR ) and is zero on B , ( see ( 4.7 ) and ( 5.3 ) ) . We assume that - f = 0 in BR , fix & E ( 0 , R r ) , and consider an arbitrary function ( ) = ( 0n ) € C ( S ) with support in Be . Then Lemma 7.1 and ...
... belongs to V - 2 [ 3 ] -n - 8 ( BR ) and is zero on B , ( see ( 4.7 ) and ( 5.3 ) ) . We assume that - f = 0 in BR , fix & E ( 0 , R r ) , and consider an arbitrary function ( ) = ( 0n ) € C ( S ) with support in Be . Then Lemma 7.1 and ...
Sayfa 549
... belongs to the space Ep 0 < p ≤ ∞ , if the function g ( w ) : = ƒ [ 4+ ( w ) ] { / 4'4 ( w ) belongs to Hp ( if p p∞ , we agree that / ' + ( w ) = 1 ) . An arbitrary function f Ep has nontangential boundary values f ( § ) at almost ...
... belongs to the space Ep 0 < p ≤ ∞ , if the function g ( w ) : = ƒ [ 4+ ( w ) ] { / 4'4 ( w ) belongs to Hp ( if p p∞ , we agree that / ' + ( w ) = 1 ) . An arbitrary function f Ep has nontangential boundary values f ( § ) at almost ...
Sayfa 561
... belongs to L2 ( R + ) if € dom ( H ) , but " and py separately may fail to belong to L2 ( R + ) . However , they belong to L1 ( R + ) . The operator H is essentially selfadjoint . This fact is proved in §5 . We denote by Hd the closure ...
... belongs to L2 ( R + ) if € dom ( H ) , but " and py separately may fail to belong to L2 ( R + ) . However , they belong to L1 ( R + ) . The operator H is essentially selfadjoint . This fact is proved in §5 . We denote by Hd the closure ...
İçindekiler
S Buslaev M V Buslaeva and A Grigis Adiabatic asymptotics | 437 |
Volchkov A local tworadii theorem on the sphere | 453 |
A Kokotov and B Plamenevskii On the asymptotics of solutions | 477 |
Telif Hakkı | |
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Abelian group absolutely continuous Aleksandrov algebra American Mathematical Society angle assume asymptotics boundary values bounded braid Chevalley groups coefficients commutative comparison triangle condition cone consider constant convergence convex Corollary corresponding curvature curve defined denote differential dimension domain eigenvalues element English transl equation estimate exists finite formula function geodesic homomorphism hyperplane section implies inequality integral lattices isometry lattice of minimum Lemma linear Math Mathematics Subject Classification matrix metric minimal vectors Moreover nonzero norm obtain operator orthogonal P₁ parabolic subgroups PETERSBURG points polynomial problem proof of Theorem Proposition prove r₁ refinable functions regular triangulation respectively root subgroups S₁ satisfies selfadjoint simplicial solutions space spectrum statement subharmonic functions Subsection subspace summands Suppose t₁ twist number unipotent unique W₁ zero